Given that lines S and T are parallel and one angle is labeled 22°, we can use the properties of parallel lines and angles:
- Corresponding Angles: If a transversal crosses two parallel lines, corresponding angles are equal.
- Alternate Interior Angles: Alternate interior angles are also equal.
- Same-Side Interior Angles: These angles are supplementary, but that does not apply to our case.
Assuming that the angle labeled 22° is an exterior angle created by a transversal, the three angles that will also be 22° are corresponding angles and alternate interior angles.
Typically, these angles would be:
- One corresponding angle on the same side of the transversal (the angle above or below).
- One alternate interior angle (the angle inside the two parallel lines).
- One more corresponding angle on the opposite parallel line (again above or below).
If you are asked to select three angles from the given options, look for these angles that follow the rules above. However, since I cannot see the specific options labeled 1 through 7, I recommend identifying:
- The angle directly corresponding to the 22° angle.
- The alternate interior angle directly inside the parallel lines.
- The corresponding angle on the parallel line opposite to the transversal.
These should be your three angles that are also 22°.